No, the two are not equivalent.
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1 5 8
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4 6 9
is a tree satisfying property 2, but not property 1.
Property 1 implies property 2, however.
Proposition: In a binary tree that is balanced according to property 1 with
n inner nodes, all leaves are at a depth of
n = 2^k - 1
2^k <= n < 2^(k+1)-1, and there are leaves at depth
Proof: (By induction on the number of inner nodes)
n = 1 = 2^1-1, there are one or two leaves at depth 1 (root is at depth 0).
n = 2, one subtree has one inner node, all leaves in that subtree are at depth 2, the other subtree is empty or a leaf at depth 1.
n >= 2 and consider a binary tree that is balanced according to property 1 with
n+1 inner nodes.
n is even,
n = 2*m, both subtrees must have
m inner nodes, and the depth property holds by the induction hypothesis.
n = 2*m+1 is odd, one subtree has
m inner nodes, the other
2^k <= m < 2^(k+1)-1, the subtree with
m inner nodes has leaves at depth
k+1, and possibly leaves at depth
k by the induction hypothesis. The tree with
m+1 inner nodes also has leaves at depth
k+1 and possibly (if
m+1 < 2^(k+1)-1) at depth
m = 2^k - 1, the subtree with
m inner nodes has leaves only at depth
k, and the subtree with
m+1 inner nodes has leaves at depth
k+1 and possibly at depth